Answer:
The uncertainty in the location that must be tolerated is [tex]1.163 * 10^{-5} m[/tex]
Explanation:
From the uncertainty Principle,
Δ[tex]_{y}[/tex] Δ[tex]_{p}[/tex] [tex]= \frac{h}{2\pi }[/tex]
The momentum P[tex]_{y}[/tex] = (mass of electron)(speed of electron)
= [tex](9.109 * 10^{-31}kg)(995 * 10^{3} m/s)[/tex]
= [tex]9.0638 * 10^{-25}kgm/s[/tex]
If the uncertainty is reduced to a 0.0010%, then momentum
= [tex]9.068 * 10^{-30}kgm/s[/tex]
Thus the uncertainty in the position would be:
Δ[tex]_{y} = \frac{h}{2\pi } * \frac{1}{9.068 * 10^{-30} }[/tex]
Δ[tex]_{y} \geq 1.163 * 10^{-5}m[/tex]
